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OAB is a sector of a circle, centre O - OCR - GCSE Maths - Question 16 - 2019 - Paper 5
Question 16
OAB is a sector of a circle, centre O. OA = 6 cm and AX is perpendicular to OB. The area of sector OAB is 6π cm². Show that AX = 3√3 cm.
Worked Solution & Example Answer:OAB is a sector of a circle, centre O - OCR - GCSE Maths - Question 16 - 2019 - Paper 5
Step 1
The area of sector OAB is 6π cm².
Answer
The area of a sector of a circle can be calculated using the formula:
ext{Area} = rac{ heta}{360°} imes ext{π} r^2where ( r ) is the radius and ( \theta ) is the angle in degrees. Given that OA = 6 cm, we have:
ext{Area} = rac{ heta}{360°} imes ext{π} (6)^2 = rac{ heta}{360°} imes 36πSetting this equal to the provided area of 6π cm²:
rac{ heta}{360°} imes 36π = 6πDividing both sides by π gives:
rac{ heta}{360°} imes 36 = 6Thus:
heta = rac{6 imes 360°}{36} = 60°.Hence, the angle OAB (or θ) is 60°.
Step 2
Show that AX = 3√3 cm.
Answer
In triangle OAX, we know:
- OA = 6 cm
- Angle OAX = 90°
- Angle OAB = 60°
Using the fact that the sum of angles in a triangle is 180°, we can find angle AXO:
In triangle OAX, we can use the sine function since we know an angle and the length of the opposite side to AX (which is OA):
ext{sin}(30°) = \frac{AX}{OA} \Substituting the known values:
ext{sin}(30°) = \frac{AX}{6} \Since ( ext{sin}(30°) = \frac{1}{2} ), we get:
\frac{1}{2} = \frac{AX}{6} \Multiplying both sides by 6 gives:
To find AX in terms of √3, consider the cosine function:
ext{cos}(30°) = \frac{AX}{OA} \This gives:
\frac{\sqrt{3}}{2} = \frac{AX}{6} \Thus:
Therefore, we have shown that AX = 3√3 cm.